Abstract We prove that the PNP-type query complexity (alternatively, decision list width) of any Boolean function f is quadratically related to the PNP-type communication complexity of a lifted version of f. As an application, we show that a certain “product” lower bound method of Impagliazzo and Williams (CCC 2010) fails to capture PNP communication complexity up to polynomial factors, which answers a question of Papakonstantinou, Scheder, and Song (CCC 2014)
AbstractWe examine the power of Boolean functions with low L1 norms in several settings. In a large ...
Lifting theorems are theorems that relate the query complexity of a function f : {0, 1}^n â {0, 1}...
Is it easier to solve two communication problems together than separately? This question is related ...
We prove that the PNP-type query complexity (alternatively, decision list width) of any boolean func...
We prove that the PNP-type query complexity (alternatively, decision list width) of any Boolean func...
We prove that the P^NP-type query complexity (alternatively, decision list width) of any boolean fun...
The complexity class ZPPNP[1] (corresponding to zero-error randomized algorithms with access to one ...
For any n-bit boolean function f, we show that the randomized communication complexity of the compos...
The complexity class ZPPNP[1] (corresponding to zero-error randomized algorithms with access to one ...
This will be a tutorial-style talk, with a particular focus on the following result. For any n-bit ...
AbstractThe methods “Rank” and “Fooling Set” for proving lower bounds on the deterministic communica...
The goal of this thesis is to prove lower bounds in communication complexity by exploiting new conne...
Abstract. We develop a new technique for proving lower bounds in property testing, by showing a stro...
AbstractWe study the complexity of decision problems that can be solved by a polynomial-time Turing ...
A couple of years ago, Blais, Brody, and Matulef put forward a methodology for proving lower bounds ...
AbstractWe examine the power of Boolean functions with low L1 norms in several settings. In a large ...
Lifting theorems are theorems that relate the query complexity of a function f : {0, 1}^n â {0, 1}...
Is it easier to solve two communication problems together than separately? This question is related ...
We prove that the PNP-type query complexity (alternatively, decision list width) of any boolean func...
We prove that the PNP-type query complexity (alternatively, decision list width) of any Boolean func...
We prove that the P^NP-type query complexity (alternatively, decision list width) of any boolean fun...
The complexity class ZPPNP[1] (corresponding to zero-error randomized algorithms with access to one ...
For any n-bit boolean function f, we show that the randomized communication complexity of the compos...
The complexity class ZPPNP[1] (corresponding to zero-error randomized algorithms with access to one ...
This will be a tutorial-style talk, with a particular focus on the following result. For any n-bit ...
AbstractThe methods “Rank” and “Fooling Set” for proving lower bounds on the deterministic communica...
The goal of this thesis is to prove lower bounds in communication complexity by exploiting new conne...
Abstract. We develop a new technique for proving lower bounds in property testing, by showing a stro...
AbstractWe study the complexity of decision problems that can be solved by a polynomial-time Turing ...
A couple of years ago, Blais, Brody, and Matulef put forward a methodology for proving lower bounds ...
AbstractWe examine the power of Boolean functions with low L1 norms in several settings. In a large ...
Lifting theorems are theorems that relate the query complexity of a function f : {0, 1}^n â {0, 1}...
Is it easier to solve two communication problems together than separately? This question is related ...